5.00 credits
30.0 h + 15.0 h
Q1
Teacher(s)
Language
English
Prerequisites
 LMAT1221 Analyse mathématique 3 (or an advanced analysis course covering sequences and series of functions and the divergence theorem),
 LMAT1321 Analyse fonctionnelle et équations aux dérivées partielles (or an introductory course on Functional Analysis),
 LMAT1322 Théorie de la mesure (or an introductory course on measure theory and the Lebesgue integral).
 LMAT1321 Analyse fonctionnelle et équations aux dérivées partielles (or an introductory course on Functional Analysis),
 LMAT1322 Théorie de la mesure (or an introductory course on measure theory and the Lebesgue integral).
Main themes
The course develops techniques to solve problems involving partial differential equations based on real analysis tools.
Learning outcomes
At the end of this learning unit, the student is able to :  
1  Contribution of the course to learning outcomes in the Master in Mathematics programme. By the end of this activity, students will have made progress in :  Choose and use calculation tools to solve mathematical problems.  Identify the fundamental concepts of important current mathematical theories.  Establish the main connections between these theories, analyse them and explain them through the use of examples.  Identify, by use of the abstract and experimental approach specific to the exact sciences, the unifying features of different situations and experiments in mathematics or in closely related fields.  Show evidence of abstract thinking and of a critical spirit.  Argue within the context of the axiomatic method.  Construct and draw up a proof independently, clearly and rigorously.  Recognise the key arguments and the structure of a proof.  Evaluate the rigour of a mathematical or logical argument and identify any possible flaws in it.  Distinguish between the intuition and the validity of a result and the different levels of rigorous understanding of this same result.  Write a mathematical text according to the conventions of the discipline.  Find sources in the mathematical literature and assess their relevance.  Correctly locate an advanced mathematical text in relation to knowledge acquired.  Ask relevant and lucid questions on an advanced mathematical topic in an independent manner. Learning outcomes specific to the course. By the end of this activity, students will be able to :  State, prove and illustrate propositions concerning properties of solutions of partial differential equations, and also the existence and uniqueness of such solutions.  Propose one or several strategies to establish the existence of solutions.  Apply tools from real analysis to solve a problem.  Manipulate notions from advanced analysis.  Contextualize mathematical tools in their historical setting and understand how they evolved. 
Content

Harmonic functions: Mean value property, regularity, maximum principle

Harnack inequality, Liouville Theorem

GaussGreen formulas, fundamental solution, distributions, Green's function

Perron's method

Sobolev spaces, elliptic boundary value problems

Heat equation: Fundamental solution, maximum principle, regularity

Wave equation: Explicit solution
Teaching methods
Learning activities consist of lectures and practical exercises. The lectures focus on and explain the subject's topics, tools, techniques and methods. The supervised practical exercises allow students to become familiar with topics, tools, techniques and methods in the field.
The practical exercise sessions aim to teach students how to choose and use methods in order to solve problems.
Activities are held in presential sessions.
The practical exercise sessions aim to teach students how to choose and use methods in order to solve problems.
Activities are held in presential sessions.
Evaluation methods
Learning will be assessed by means of homework during the semester and by a final examination.
Questions in the final examination will ask students to :
 reproduce material, especially definitions, theorems, proofs and examples
 demonstrate a certain mastery of the available tools
 explain the limits of a method or a tool
Assessment will be on the basis of :
 knowledge, understanding and application of the different mathematical objects and methods from the course
 precision of calculations
 rigour of arguments, proofs and reasons
 quality of presentation of answers
Questions in the final examination will ask students to :
 reproduce material, especially definitions, theorems, proofs and examples
 demonstrate a certain mastery of the available tools
 explain the limits of a method or a tool
Assessment will be on the basis of :
 knowledge, understanding and application of the different mathematical objects and methods from the course
 precision of calculations
 rigour of arguments, proofs and reasons
 quality of presentation of answers
Online resources
Lecture notes will be available via Moodle.
Bibliography
 Lawrence C. Evans, Partial Differential Equations, Graduate Studies in Mathematics, AMS, 2010.
 Augusto C. Ponce, Elliptic PDEs, Measures and Capacities, EMS Tracts in Mathematics, vol. 23, European Mathematical Society (EMS), Zürich, 2016.
Teaching materials
 matériel sur moodle
Faculty or entity